Regularized total least squares approach for nonconvolutional linear inverse problems

Author

Zhu, Wenwu ; Wang, Yao ; Galatsanos, Nikolas P. ; Zhang, Jun

Author_Institution

Bell Labs., Lucent Technol., Murray Hill, NJ, USA

Volume

8

Issue

11

fYear

1999

fDate

11/1/1999 12:00:00 AM

Firstpage

1657

Lastpage

1661

Abstract

In this correspondence, a solution is developed for the regularized total least squares (RTLS) estimate in linear inverse problems where the linear operator is nonconvolutional. Our approach is based on a Rayleigh quotient (RQ) formulation of the TLS problem, and we accomplish regularization by modifying the RQ function to enforce a smooth solution. A conjugate gradient algorithm is used to minimize the modified RQ function. As an example, the proposed approach has been applied to the perturbation equation encountered in optical tomography. Simulation results show that this method provides more stable and accurate solutions than the regularized least squares and a previously reported total least squares approach, also based on the RQ formulation

Keywords

conjugate gradient methods; image reconstruction; inverse problems; least squares approximations; optical tomography; RQ formulation; RTLS estimate; Rayleigh quotient formulation; TLS problem; conjugate gradient algorithm; linear operator; nonconvolutional linear inverse problems; optical tomography; perturbation equation; regularization; regularized total least squares; smooth solution; Biomedical optical imaging; Equations; Geophysics computing; Image reconstruction; Image restoration; Inverse problems; Least squares approximation; Least squares methods; Optical noise; Tomography;

fLanguage

English

Journal_Title

Image Processing, IEEE Transactions on

Publisher

ieee

ISSN

1057-7149

Type

jour

DOI

10.1109/83.799895

Filename

799895